The centroid of a lamina is the point at which it could be balanced if it was suspended. It represents the center of mass of the lamina and is the point where all the mass could be concentrated to achieve balance. The centroid is an important concept in engineering and physics for determining the equilibrium and stability of objects.
To find the coordinates of the centroid of the tetrahedron whose vertices are (x 1 , y 1 , z 1 ), (x 2 , y 2 , z2 ), (x 3 , y 3 , z3 ) and (x 4 , y 4 , z4 ).Let A( x 1, y 1, z 1), B( x 2, y 2, z 2), C( x 3, y 3, z 3), D( x 4, y 4, z 4) be the vertices of tetrahedron ABCD. If G 1 is the centroid of ?BCD, then its coordinates areSince G( x, y, z), the centroid of tetrahedron ABCD divides the line AG 1 in the ratio 3 : 1.?Similarly,Hence the centroid isSOLN BY GAURAV CHOUDHARY
The pressure inside an inverted hollow cylinder in water is equal to the pressure at the depth of the cylinder's centroid multiplied by the specific weight of water. To calculate it, use the formula: pressure = (specific weight of water) * (depth of centroid of cylinder).
E(photon energy)=K.E+Work Function
The Arrhenius equation was created by Svante Arrhenius in 1889, based on the work of Dutch chemist J. H. van't Hoff. The rate equation shows the effect of changing the concentrations of the reactants on the rate of the reaction.
The centroid of a parabola is found with the equation y = h/b^2 * x^2, where the line y = h. Additionally, the area is 4bh/3.
# First find the circumcenter & centroid. # subtract centroid from circumcenter.
the centroid is the intersection of medians
The centroid of a triangle is where the median of each side meet.
The centroid is where all the medians in a triangle meet.
2/3 of the median is between the centroid and the vertex, 1/3 between the centroid and the side.
Mention all the properties of CENTROID, ORTHOCENTRE, CIRCUMCENTRE ?
the centroid is the balance point of the triangle
orthocenter* * * * *No it is not. It is the centroid - where the medians meet.The centroid.
Every triangle has an incentre, circumcentre, orthocentre and centroid.
The centroid is the centre. How you find it depends on what information you have about the hypersphere.
Find the median of each side of the triangle. The centroid is where all three lines meet.